Fractional Brownian motion in presence of two fixed adsorbing boundaries

Abstract

We study the long-time asymptotics of the probability Pt that the Riemann-Liouville fractional Brownian motion with Hurst index H does not escape from a fixed interval [-L,L] up to time t. We show that for any H ∈ ]0,1], for both subdiffusion and superdiffusion regimes, this probability obeys (Pt) - t2 H/L2, i.e. may decay slower than exponential (subdiffusion) or faster than exponential (superdiffusion). This implies that survival probability St of particles undergoing fractional Brownian motion in a one-dimensional system with randomly placed traps follows (St) - n2/3 t2H/3 as t ∞, where n is the mean density of traps.